💬 👋 We’re always here. Join our Discord to connect with other students 24/7, any time, night or day.Join Here!
Get the answer to your homework problem.
Try Numerade free for 30 days
Like
Report
In Chapter $1,$ we learned that any repeating decimal is a rational number; that is, it can be expressed as a quotient of integers. Thus, the repeating decimal$0.99999 \ldots$ with an endless string of $9 \mathrm{s},$ must be a rational number. to discover the surprising simplest form of this rational number.Use long division to write a repeating decimal representation for $\frac{2}{3}$.
Precalculus
Chapter 14
Sequences and Series
Section 3
Geometric Sequences
Introduction to Sequences and Series
Introduction to Combinatorics and Probability
Johns Hopkins University
Piedmont College
Oregon State University
Boston College
Lectures
07:16
In mathematics, a continuo…
04:09
00:26
Writing a Repeating Decima…
00:37
00:23
Convert the fraction to a …
00:44
00:06
01:48
An infinitely repeating de…
00:19
03:04
01:41
00:38
Determine whether each num…
Okay, Head. In this case, we just need to write in the rational and perform that speed bike. You. We have a decimal form, which is 0.297 bar. The concept is very clear. We will be using as number containing bar is equivalent to nine here. So there are three numbers which contains about so that the nominated will be 39 on that number itself. Right. So that finally leads equivalent to 97 99. My name tonight. Okay.
View More Answers From This Book
Find Another Textbook
In mathematics, a continuous function is a function for which sufficiently s…
Writing a Repeating Decimal as a Rational Number Find the rational number re…
Convert the fraction to a decimal. Place a bar over repeating digits of a re…
An infinitely repeating decimal is an infinite geometric series. Find the ra…
Determine whether each number is a repeating or a nonrepeating decimal, and …
03:02
Which numbers in the following set are natural numbers, whole numbers, integ…
00:07
Add.$$-\frac{3}{4}+\frac{1}{4}$$
01:14
Use the binomial theorem to expand each expression. See Examples 4 and $5 .$…
01:10
Write each product using exponents. See Example $1 .$$$m \cdot m \cd…
00:55
The number of classes still open is the difference of 150 and the number of …
Find the indicated term of each binomial expansion. See Example 6$(a+3 b…
00:48
Find the prime factorization of each number.$$125$$
00:54
Solve each equation or inequality. See Examples 7 and $8 .$$$|4 x+1|…
00:18
Add.$$17+(-12)+(-23)$$
01:27
Create an account to get free access
Join Numerade as a
By clicking Sign up you accept Numerade's Terms of Service and Privacy Policy
or sign in with
Already have an account? Log in
